Helicity spectra and topological dynamics of vortex links at high Reynolds numbers

Abstract We employ reconnection-capable, vortex filament methods and finite-volume, Navier–Stokes flow solvers to investigate the topological and helicity dynamics of vortex links for medium and high Reynolds numbers. Our vortex-dynamical model is based on discretization of vortex tubes into bundles of numerical analogues of vortex lines. Due to their nearly singular nature, the numerical vortex lines have topological writhe but not twist. By means of our reconnecting vortex tube model, it is shown that the helicity of a vortex link is conserved during the unknotting process. The dynamics of linking and writhe topological measures indicate that most of the initial linking becomes writhe during the post-reconnection evolution. The helicity spectra of the vortex link present alternating-sign helicity fluctuations at all (potential flow) scales up to the vortex core. At pre-reconnection times, these fluctuations are damped by Biot–Savart vortex stretching and helicity becomes single signed. The post-reconnection spectra indicate an inverse helicity cascade corresponding to the creation of a homogenized vortex blob, a process reminiscent of coherent structure formation in turbulence. An accompanying Navier–Stokes calculation of vortex link dynamics at Reynolds numbers $Re=1500$ confirms the post-reconnection transformation of linking into different topological measures, the pre-reconnection damping of helicity spectra fluctuations and the spectral shift to low wavenumbers at post-reconnection times. Due to viscous dissipation action, however, this shift is accompanied by progressive reduction of helicity peak values.

where Γ i is the circulation of tube i, Lk ij is the Gauss linking number of tubes i and j, and Wr i and Tw i are, correspondingly, the writhe and twist of tube i. The sum of Wr i and Tw i is the Cǎlugǎreanu self-linking number SLk i , which measures the degree of knottedness of single closed tubes, and, according to Cǎlugǎreanu's theorem (Cǎlugǎreanu 1961;, is a topological invariant. Helpful discussions of these topological concepts in the contexts of physics applications are available in Scheeler et al. (2017) and Berger & Prior (2006). Remarkably, the formula relates helicity with linking measures, which are directly connected with curve geometry ( § 4 in this paper). This is because helicity is a measure of streamline right-or left-handedness, and this is exactly what the Lk number measures in a geometry, since for a system of i curves, Lk = i w i /2, i.e. Lk is a summation over weights of all crossings between different curves. The crossings are counted on a two-dimensional projection of the curve system along an arbitrary direction, and their weights are w = +1 for each right-handed crossing and w = −1 for each left-handed crossing. On the helicity side, the counting becomes an integral, and the weights are automatically encoded in the signs of the inner products between velocity and vorticity. The circulation factors in the Moffatt & Ricca formula are then a dimensional book-keeping, as implied by the Biot-Savart law. Recently, new important developments indicated derivation of the skein relations of the HOMFLYPT polynomial for ideal fluid knots from helicity (Liu & Ricca 2015). Similar associations of helicity with other knot polynomials (Sossinsky 2004) or Vassiliev invariants above the lowest order (Mostovoy, Chmutov & Duzhin 2017) are highly desirable. It would certainly be important to find new conserved flow quantities that correspond to these types of invariants. The Moffatt & Ricca formula offers new points of view for physics investigations. Indeed, let us consider, without loss of generality, a case where the ring cores (that set the characteristic scale of reconnection area, hence, also of dissipative effects) are much smaller than the ring diameters. Since the latter plausibly indicate the scale where most of net helicity ought to reside, one argues that, at sufficiently high Reynolds numbers, and correspondingly small reconnection durations, a small-scale dissipative effect (reconnection) ought not to alter significantly a large-scale quantity (helicity). To transfer intuition from turbulence physics, Taylor-scale dissipative processes destroy, at any time, a small part of the kinetic energy of the large, energy-containing motions. Such arguments would suggest that, at high Reynolds number (Re 1), for helicity to be approximately the same before and after reconnection, the Moffatt & Ricca formula needs to predict a change of helicity from one type of topological measure (Lk ij ) to another (Wr i + Tw i ). A topological justification of the same conclusion was offered by Pfister & Gekelman (1990). Employing ribbons for theoretical illustration, they argued that Lk becomes Tw during reconnection. We show here that, in our vortex-dynamical model, Lk becomes Wr, which is something similar, since Pfister & Gekelman (1990) and  indicate how twist (formed by helical winding of one ribbon edge about the other) can be transformed to writhe (corresponding to self-intersections of the ribbon centreline in a two-dimensional projection of it) via continuous transformations. This interchangeability of Wr and Tw is implied by the topological nature of SLk, and can even be realized when topological calculations that refer to the same geometry employ different view angles (Klenin & Langowski 2000).
These matters were first experimentally clarified by Scheeler et al. (2014), who measured the post-reconnection Wr and showed that it was comparable with the initial Lk value. Their experimental techniques did not allow them to measure directly the post-reconnection twist, but the measured writhe values were adequate for demonstrating the relatively small effect of the reconnection on helicity levels. There are two important remarks implied by their results: (a) small helicity changes can correspond to marked changes in topological measures, i.e. for similar pre-and post-reconnection helicity levels, all initial linking becomes writhe and twist, and (b) in the spirit of the physical arguments above, Re must be high. Indeed, Re ∼ 2 × 10 4 in the experiment of Scheeler et al. (2014). At sufficiently small Re, the link dynamics would tend to create writhe and twist, but, in the absence of adequately large inertia, the latter is overwhelmingly damped by viscosity, a process providing a topological interpretation of helicity dissipation.
The purpose of this work is to theoretically probe the high-Re helicity and topological dynamics of vortex links. There are three key aspects of our contribution. (a) We employ a discrete, yet finite-core, vortex-dynamical model of Hopf links, which corresponds to the limit of high-Reynolds-number vortex dynamics. In this respect, we took advantage of methods originating in quantum fluid dynamics (Kivotides 2018b;Galantucci et al. 2019), but adapted to Navier-Stokes vortex dynamics (Kivotides & Leonard 2003a), and successfully applied to high-Reynolds-number turbulence (Kivotides & Leonard 2004a,b, 2003b, magnetohydrodynamics (Kivotides, Mee & Barenghi 2007b) and solid-fluid dynamics (Kivotides et al. 2007a). These references include, among others, comparisons between quantum and classical vortex dynamics, details about the reconnection algorithm and the effects on performance of its various parameters, systematic comparison with numerical solutions of the Navier-Stokes equations, reproduction of key Navier-Stokes turbulence spectra scalings, turbulence kinematics and geometrical physics, as well predictions of kinematic magnetohydrodynamic dynamo spectra and depictions of particle-vortex interactions in turbulent suspensions. Our reconnection algorithm originates in the work of Schwarz on quantum vortex dynamics Schwarz (1985). However, there are important differences between quantum and classical vortex dynamics. The former case deals with discrete vortex lines of singular vorticity and constant (in all flow cases) circulations, whilst the second involves finite, dynamic core tubes with continuous vorticity distributions and freely varying circulations. During tube reconnection, many vortex lines (which discretize the tube vorticity) can reconnect in close succession. It is important to preserve tube integrity during this process. This requires a careful choice of the vortex approach distance upon which topological surgery takes place. In the calculations presented here, we have chosen the smallest distance that does not lead to unphysical results during tube stretching dynamics, as are erroneous Lk increments before the onset of reconnections. To be more specific, there is a different approach to reconnections in the two cases: in quantum fluids, reconnections are performed when two vortices approach closer than a computational reconnection distance (CRD) which is of the order of their numerical discretization length. Small CRD changes do not lead to large changes in the results. This is because, in quantum fluids, there are no finite-core vortex tubes, but only isolated line vortices (known as topological defects in quantum field theory). In classical fluids, however, CRD choice follows a more elaborate, iterative procedure. For the particular vortex core and circulation in the initial conditions, we start by employing a CRD of the order of the numerical discretization along the vortex contours, and we perform a series of computations with decreasing CRD. The main concerns are to keep tube integrity during reconnection, and, at the same time, not to have unphysical topological changes before reconnection onset. The final CRD chosen is the smallest CRD that satisfies both both of the above requirements. The details of the corresponding series of numerical calculations and their accompanying CRD values are discussed in the computational methodology section. Moreover, in the present context, we also apply the model of Kivotides & Leonard (2003a) with constant cores, i.e. without diffusive core growth; hence the sole physical effect of reconnections is to effect topological change. In this way, our vortices are numerical analogues of reconnecting, vortex lines in the high-Reynolds-number limit. (b) In contrast with the standard spectra of velocity or vorticity vector fields which refer to the squares (energy and enstrophy) of these quantities, we employ methods for the computation of the spectra of the actual helicity values. Hence, our helicity spectra inform not only about the scale-by-scale partition of helicity, but also about the sign of the latter. Employing these methods, we accurately probe the interscale helicity transfer processes. (c) We calculate the topological measures in the Moffatt & Ricca formula with great precision, by transferring to vortex dynamics robust topology measuring methods first developed in the context of DNA biopolymer studies. After discussing the mathematical details of each of these tools, we apply them to vortex-link dynamics and discuss the resulting physics.

Discrete model of reconnecting vortex tubes
In order to theoretically match the high Reynolds numbers in experiments, and, in fact, to do even better in this respect, we note that in the limit of Re 1 vortex-link dynamics, one expects a small (in comparison with the total energy content) amount of dissipation, whose main role is to facilitate vortex reconnection. These physical requirements are matched by the mesoscopic model of quantum vortex dynamics employed in superfluids research (Kivotides 2018b(Kivotides , 2014. Whilst at microscopic scales an (inviscid) supefluid flows under the influence of its quantum stress that controls fluid density and effects reconnections (Legget 2006), at mesoscopic scales a superfluid behaves like an incompressible fluid with phenomenological reconnections (Feynman 1955;Schwarz 1985;Kivotides 2014). In this context, the vortices are slender filaments, and vorticity is distributed within their finite cores via suitable smoothing kernels: where the circulation of tube i is Γ i and its centreline C i is given by the space curve r i (ξ ), where ξ is the arclength parametrization of curve C i . The function p determines the vorticity distribution over the core of the tube having an effective radius of σ , and facilitates stable numerical calculations. The calculations are performed with the Gaussian kernel of Winckelmans & Leonard (1993): (2.2) Inserting the above definition of vorticity in the Biot-Savart integral reduces the latter to a sum of line integrals over each filament centreline contour: where function Q(φ) (with φ = |r i − x|/ √ 2σ ) depends on the particular smoothing kernel employed. For the Gaussian kernel case, it is (Leonard 1985;Winckelmans & Leonard 1993) There are some important features: by employing the smoothing kernel, we transform line vortices to vortex tubes. This is very much in agreement with the derivation of the Moffatt & Ricca formula  where both writhe and twist are forms of self-linking involving the vortex lines within single tubes. Pfister & Gekelman (1990),  and Scheeler et al. (2014) offer nice illustrations of this point. Hence, our model entails both Lk and Wr physics. On the other hand, since the numerical tubes are not capable of core deformation, by default, there is no Tw in our flow field. It is important to discuss this last point to accurately embed our method within the general context of topological vortex physics. In the context of single vortex tube dynamics, there are two relevant topological quantities: Wr and Tw (Asgari-Targhi & Berger 2009). They measure the topology of the continuum bundle of vortex lines that comprise the tube, with each line providing infinitesimal contribution to the total flux. So in continuum physics, we need an infinity of vortex lines to model each of the two finite tubes that comprise a Hopf link. In our numerical approach, we discretize the finite-core tubes into bundles of finite number of vortices. The cores of the latter are (by construction) non-deformable, and do not include twisted vortex lines. In other words, there are no physically dynamical cores associated with our discrete vortices, whose evolution we can meaningfully track in time. At every time step, the line vortices are 'dressed' with (constant) numerical cores, which, once the smoothed velocity field is computed, are discarded, and do not propagate to the next time step. As mentioned above, this smoothing includes Wr physics but not Tw physics. Our results are physically consistent, since, further on, we demonstrate an excellent correspondence between topological measures based on the discrete vortices (excluding Tw) and flow field helicity values. Attributing Tw to our discrete vortices would add to topology a feature that is not present in the flow field. This would, by default, invalidate our computation, since the helicity spectra, for example, would not correspond to the topological helicity values.
Certainly, by defining an effective core based on the boundaries of numerical vortex bundles, one can compute Tw values for the macroscopic tubes, and, by considering the contour of the bundle-centreline vortex, also Wr values, if needed. It is only the Tw of the discrete vortices that is not modelled within the numerical approximation. So let us discuss in detail how our numerical method tackles vortex-dynamical processes that involve Tw dynamics. Take for example (Asgari-Targhi & Berger 2009) the case of a circular vortex tube that is given a large-scale turn so that it approaches a figure-of-eight shape. Since there is a variation of Wr, helicity conservation implies an opposite sign variation of Tw. Such a situation is handled in our method by discretizing the original tube into a bundle of elementary (Tw-free) vortices. During the figure-of-eight formation, the vortices in the tube get twisted generating Tw in the macroscopic tube, whilst the computation of the macroscopic tube Wr is based on the vortex at the bundle centreline. On the other hand, by decreasing the circulation of discrete vortices and the discretization length along vortex contours, we can increase the accuracy and resolution of our calculations as desired.
On another front, the phenomenological (jump process) nature of the reconnections in our system (Kivotides 2014) is fully compatible with the discrete character of topological change, and, indeed, Pfister & Gekelman (1990) employ a similar jump process in their demonstration of helicity conservation during ribbon reconnection. In conclusion, we expect that, due to lack of dissipation, and within the accuracy levels of our vortex-dynamics methodology, helicity is going to be conserved, modulo transient, spurious physical effects due to the discontinuous nature of reconnections in our model, yet the topological dynamics will be accurate, and helicity-related conclusions qualitatively correct. On the other hand, we gain important insight into high-Reynolds-number vortex dynamics.
To cross-check our calculations, we compute helicity with both vortex dynamics and topological formulae. Within the former (Winckelmans & Leonard 1993), total vorticity H is given by where q σ (r) = q(|r|/σ ) and In discretizing actual Navier-Stokes vortex tubes in terms of elementary vortex filaments, we employ the methods of Knio & Ghoniem (1990) and Winckelmans & Leonard (1993). Although our approach follows closely that of Winckelmans & Leonard (1993), the presence of reconnections in our model imposes strict discretization constraints, not present in previous works. To set up a discretization of a ring-like vortex tube, we choose the 'quantum' of circulation, i.e. the circulation Γ i of each elementary vortex i, which is set equal to κ for all vortices, and the circulation Γ m of the 'macroscopic' tube. The ratio n v = Γ m /κ can be thought of as the number of 'grid points' that are required to approximate the internal dynamics of the macroscopic vortex tube. The idea in Knio & Ghoniem (1990) and Winckelmans & Leonard (1993) is to discretize the macroscopic tube into a sequence of n c layers (toroidal shells), each one containing 8n c elementary vortices. Hence, n v determines the number of discretization layers. By taking the outer radius of each layer (measured from the tube centreline and on a plane normal to the latter) equal to (2n c + 1)r , and having the elementary vortices passing through each layer along a perimeter of radius r c = (1 + 12n 2 c /6n c )r (also measured from the tube centreline), we place each vortex at the centre of an area πr 2 = πR 2 t /n v . Here, R t is the tube core radius. Notably, in this construction, the macroscopic tube centreline is always occupied by a line vortex. A central point is that, in the phenomenological reconnections model, the elementary vortices reconnect when they approach closer than δ ≈ 0.1 ξ , where ξ is the discretization length along the vortices. We need the vortices to reconnect as a result of vortex-dynamically generated configurations, and not artificially, due to small distances from each other in the initial conditions. Hence, δ = 0.1 ξ must be significantly smaller than r (in the calculations it is smaller by a factor of 4), and this imposes a lower resolution limit that, in turn, determines computational complexity levels. Computational complexity scales with the N 2 operations required by Biot-Savart interactions (where N is the number of numerical vortex segments). To double the Reynolds number, we need to double the bundle circulation, hence also double the number of line vortices in the system. Keeping resolution the same, the number of vortex segments becomes, in this way, 2N, and thus the computational complexity increases by a factor of 4.
3. Helicity spectra for Navier-Stokes and vortex-dynamical formulations 3.1. Navier-Stokes spectra We aim to derive here a formula for the spectrum of helicity (rather than its square). We first consider the field theoretic case, before the vortex-dynamics one. The total helicity H is given by (3.1) Substituting u and ω with their inverse Fourier transforms (we use 1/2π and exp(−ik · x) factors when taking the inverse transform, and we define k = 2π/ , with a length scale) we have Integration over x produces the delta function (2π) 3 δ(k + k ). In addition, we have that and therefore (3.3) becomes Using spherical coordinates in k-space, i.e. dk = dΩ k k 2 dk and transforming back to real space, (3.4) becomes Integration over Ω k is accomplished simply by assuming x − x is in the polar direction so that where μ is the cosine of the angle between k and x − x . Integration over μ in (3.6) gives Thus we can define the helicity spectrumĤ(k) aŝ Indeed integration ofĤ (k) gives (3.10) 3.2. Vortex-dynamics spectra The helicity spectrum formula for the vortex-dynamical model iŝ where the functionp corresponding to the employed Gaussian kernel isp(kσ ) = e −(kσ ) 2 /2 . Note thatp(0) = 1. Both formulae have an apparent singularity when considering the self-contribution to helicity of a field or vortex point. However, by calculating analytically the derivative in (3.12) employing L'Hǒpital's rule to compute the limit sinx/x when x → 0 and expanding the cross-product ∂r i (ξ )/∂ξ × ∂r j (ξ )/∂ξ around ξ when ξ → ξ , one can easily deduce that the self-contributions are equal to zero.
For an alternative derivation of the helicity spectrum based on two-point correlation functions and applied to magnetohydrodynamic dynamo physics, see Asgari-Targhi & Berger (2009).

Methods for calculating linking and writhe
To compute topological dynamics, we only need calculate Lk and Wr, since, as mentioned above, Tw in the Moffatt & Ricca formula is zero by default in our vortex dynamics. For completeness, we discuss, however, how Tw has been taken into account in other vortex-dynamics studies (Zuccher & Ricca 2015Hänninen, Hietale & Salman 2016). Hänninen et al. (2016) study Tw by constructing macroscopic tubes from single quantum vortices, which are bundled together and endowed with Kelvin wave excitations that are mild enough to allow the tubes to remain coherent for finite period of time. By considering a ribbon based on the centreline of such macroscopic tubes, Tw can be meaningfully defined and measured. However, this approach is meaningful only as long as the tube remains coherent. Our macroscopic tubes undergo reconnections and other non-trivial dynamics that do not preserve tube coherence. Hence, by basing our topological analysis on Lk and Wr of elementary vortices, we perform a more general analysis that does not rely on assumptions of tube integrity. On the other hand, the works of Zuccher & Ricca (2015 and Kedia et al. (2018) indicate that Tw can meaningfully be ascribed to a discrete quantum vortex, but this refers to core dynamics governed by quantum stresses active at microscopic scales, and are not relevant to mesoscopic scales or to classical vortex dynamics, where quantum stresses are absent. In other words, the Tw of Zuccher & Ricca (2015 and Kedia et al. (2018) is not relevant to classical fluid dynamics, and that of Hänninen et al. (2016) is entailed in the topology of the elementary vortex system.
We follow the method of Klenin & Langowski (2000), which was developed in the context of biopolymer studies, but can also be applied to vortex dynamics, by taking advantage of the discretization of each vortex into closed polygonal curves. Then, the total linking Lk = i j Lk ij is the sum of all linking numbers Lk ij between possible vortex pairs i and j, noting that Lk ij = Lk ji and Lk ii ≡ 0. Each specific linking number Lk ij is given by where N i and N j are the number of discretization segments of vortices i and j, respectively.

Vortex-dynamical calculation
The initial conditions consist of two tubes in Hopf link configuration (figure 1a). To limit computational complexity, we have chosen n v = 9. Based on tube centreline radius R c and tube circulation Γ m , we define a unit time t u = R 2 c /Γ m . Helicity values are normalized with κ 2 , so that they can be directly compared with Wr or Lk values. The effective tube radius is R t = 0.2R c .Due to their Biot-Savart interactions, the tubes are stretched as they locally align with each other on the road to reconnection (figure 1b). The latter takes place discontinuouly, as a sequence of pair reconnections between elementary vortices belonging to different tubes (figure 1b,c). Once the stretched reconnection 'bridge' disappears (figure 1d), the system evolves into a blob of fluctuating vorticity (figure 1e, f ), and by the time of 3.5t u , the initial configuration is no longer discernible. Due to the complexity of the vortex tangle comprising the resulting blob of vorticity, there is continuing reconnections activity between the elementary vortices.
To check the consistency between vortex dynamics and topology, we have computed helicity employing both its Moffatt & Ricca and vortex-dynamic (relation (3.11)) formulae. In all of following results, helicity values are normalized by dividing with appropriate Γ 2 factors, so that the initial helicity value of the vortex link is equal to two, in both vortex-dynamical and Navier-Stokes calculations. There is very good agreement (figure 2a) between the two sets of values, except close to the reconnection threshold, where vortex dynamics is not as accurate as topology. This difference between vortex-dynamical and topological evaluations is due to the fact that topological helicity evaluation does not depend on the geometry of the linked lines, and hence it is exact for all resolutions, which is not the case for the vortex-dynamical evaluation. Hence, in the latter case, results can only approximate the exact (topological) helicity in direct correspondence with the employed resolution. Taking into account that we have a link involving nine pairs of vortices, we expect Lk = 162 at t = 0, which is our topological result, which is matched exactly by the vortex-dynamical helicity value (figure 2b). As expected, Lk remains constant until the onset of reconnections. Since our vortex dynamics employs topological (i.e. cut and glue) reconnections (Pfister & Gekelman 1990), and vortex evolution obeys the Euler equations, there is no dissipation in our system (which is why we propose it as an appropriate model of high-Reynolds-number vortex dynamics). Hence, in the limit of very high resolution, when reconnections are pointwise and occur upon vortex contact, we expect helicity to be conserved, and this, indeed, is indicated by the results, after a transient of duration ∼ 0.5t u . This transient is an artifact of the discontinuous (jump process) nature of reconnections in our calculation. This, in turn, is a result of the relatively coarse grid that we employ in order to tame computational complexity. In an ideal computation, the employed fine grid would resolve all possible small-scale processes and vortices would reconnect upon quasi-contact. In such a calculation, the instantaneous drop of Lk upon reconnection would be fully compensated by an instantaneous rise of Wr. Our grid is not dense enough to capture this small-scale Wr, and hence it takes some time (∼0.5t u ) for Wr to attain its appropriate levels. To demonstrate this assertion, we zoomed in the reconnection zone of a link made of single vortices, employing a grid six times denser than the one employed in the vortex-bundle case. We found that, while the coarse grid gave post-reconnection Wr equal to approximately 27 % of pre-reconnection Lk, the dense grid increased this value to 66 %. Notably (figure 2b), the post-reconnection helicity is not all Wr, since there is reconnection-driven, continuous Lk formation/destruction activity. The corresponding reconnections are not related to the unlinking process, but take place within the emergent vortex blob. Their number depends on the employed reconnection criterion δ, i.e. the distance of approach between two filaments whereupon a reconnection jump is performed. We jumps has ceased) are [1, 1.17, 1.31, 1.5]H 0 , where H 0 is the initial helicity value. The shown results correspond to the smallest physically acceptable δ. Smaller δ values lead to (unphysical) Lk value increments before the onset of reconnections, and larger δ values produce post-reconnection helicity levels that exceed the initial value. Hence, the smallest δ value producing physically acceptable reconnections implies also conservation of helicity. This is certainly an attractive feature of the model.
At this point, our findings agree with physical and topological intuitions, and available experimental results. Indeed, as indicated in Pfister & Gekelman (1990) and Scheeler et al. (2014), the initial Lk is mainly transformed into Wr, and the total helicity is conserved. To proceed further and understand better helicity structure, we look at helicity spectraĤ(k). Remarkably, in a way reminiscent of energy spectra (Leonard 1985), theĤ(k) of a link made of two single rings fluctuates between positive and negative values at all (resolvable) scales (figure 3a). We have checked that the integration of the spectra in wavenumber space gives exactly the total system helicity.When the link is made of vortex bundles instead of single vortices (figure 3b), there is a similar fluctuating behaviour at large scales, but the fluctuations die out fast. It can be concluded that the high k helicity fluctuations are the signature of the combined potential vortex flow field around elementary vortices. By creating bundles of the latter, we create macroscopic tubes with finite-diameter, solid-body rotating cores, which (by default) have zero helicity. Indeed, it was easy to check that the cut-off of the spectrum coincides with the effective core of the macroscopic tubes. The spectra indicate that, as expected, there is a net positive helicity at large scales, but this net amount is the sum of alternating-sign helicity contributions at progressively smaller scales. What happens to helicity spectra as a result of the reconnection? There are two distinctive dynamical regimes. The first corresponds to the road to reconnection (figure 4a). There, the initial spectrum fluctuations are damped, and as total helicity is conserved, there is an elimination of significant negative helicity values. Hence, although in the 'perfect' link of the initial conditions the positive net helicity is the small difference between positive and negative values, just before reconnection there is mostly positive helicity in the system. This could very well be the spectral signature of stretched, reconnection bridge formation (figure 1b). After unlinking, we have an inverse cascade of helicity from small to large scales (figure 4b). This is an intriguing feature that reverses the pre-reconnection tendency of large-scale helicity damping. It corresponds to the formation of the homogenized vortex  Post-reconnection helicity spectraĤ(k) at times t = 1.02, t = 1.845, t = 2.02, t = 2.50 and t = 2.825 (t u units). Larger times correspond to curves with higher peaks at smaller wavenumbers. As a result of an inverse helicity cascade, a peak is formed at small wavenumbers. blob, with helicity concentrated at the scale of the (effective) blob diameter. This inverse cascade process is directly connected to the conservation of helicity in an inviscid system.
The above considerations suggest the usefulness of helicity spectra in characterizing vortex-dynamical processes. On the other hand, we have checked that the observed rapid changes in the topological measures of helicity do not affect the shape of the spectrum. This is understood by considering that helicity is a flow quantity that requires significant global changes in flow patterns in order to have its spectrum altered. On the other hand, the topology can change on a much faster scale in a 'quantum' fashion. As indicated by the results, it is reasonable to expect that different topologies could correspond to the same spectra. In other words, although helicity is always indicative of the amount of handedness in the flow, and therefore of the linking topology, we cannot use the latter to characterize key flow processes as the above inverse cascade. For this purpose, more potent topological measures would be needed, as are, for example, the above mentioned knot polynomials and Vassiliev invariants above the lowest order.

Navier-Stokes calculation
Computational complexity forbids probing high-Reynolds-number flows with Navier-Stokes calculations. Overcoming this limitation was a key motive for developing the vortex-dynamical approach. In this respect, a 512 3 grid size was shown to provide adequate resolution for capturing vortex link dynamics at Re = 1500, where Re = Γ /ν, Γ (which is analogous to Γ m in the vortex-dynamical formulation) is the circulation of each vortex tube and ν is the viscosity of the fluid. The numerical method is a projection, finite-volume technique which is described in detail elsewhere (Kivotides 2018b). The boundary conditions are periodic. To ensure that viscous dissipation processes are adequately captured, the calculation resolves their characteristic time scale t u = R 2 t /ν, where R t is the tube-core radius, which is equal to 0.2R c , and R c is the tube-centreline radius. Time is scaled with t u , total helicity Notably, we show the total helicity (rather than the mean value as with energy and enstrophy), because the normalized H is equal to 2, and we can directly compare with the vortex-dynamical results.
Due to the dissipative nature of the flow, there is monotonic energy decay (figure 5a). Similar to the vortex-dynamical case, Biot-Savart interactions induce a stretched structure of antiparallel vortices (figure 6a-d). This process intensifies enstrophy (figure 5b), and sustains energy and helicity dissipation rates (figure 5a,c). At time t = 0.186 (figure 6e), the system has proceeded beyond the enstrophy maximum; hence, the stretching process has concluded and the antiparallel vortex tubes comprising the stretched structure are in the process of annihilating each other via viscous diffusion. By time t = 29 (figure 6f ), the original link has disappeared, yet, despite the unlinking process, the system retains 70 % of its initial helicity (figure 5c). This is because there is now a significant amount of Tw and Wr in the system. Indeed, there is evidence of core torsion at the chosen isosurface level of |ω| = 154.4 (figure 6e). Overall, there is agreement with the inviscid, vortex-dynamics results on Lk transformation into other topological helicity measures. The Navier-Stokes calculation brings forward the merits of the vortex-dynamical approach, since it is tube discretization into elementary vortices, which are tracked in time, that enables the unambiguous computation of topological helicity measures in that case.
Due to computational complexity of the Navier-StokesĤ(k) formula, we present lower-resolution (64 3 ) spectra (figure 7). Based on the expected inverse helicity cascade, this is not a true limitation. Since the Reynolds number is not very large, some effects of viscous dissipation on helicity physics are anticipated. The initial stages resemble the vortex-dynamical case (figure 7a). The spectral fluctuations are damped out, whilst the total helicity does not vary significantly. Similar to the inviscid case, there is a transition from alternating-sign helicity at different scales to exclusively positive values. At larger . Navier-Stokes calculation. (a) Pre-enstrophy peak helicity spectraĤ(k) at times t = 0, t = 0.025, t = 0.037, t = 0.075 and t = 0.1 (t u units). Smaller times correspond to curves with higher peaks at small wavenumbers. (b) Post-enstrophy peak helicity spectraĤ(k) at times t = 0.302, t = 0.523, t = 0.586, t = 0.636 and t = 0.686 (t u units). Larger times correspond to curves with peaks at smaller wavenumbers. times (figure 7b), the inverse cascade of the inviscid case is present in an incomplete way. Indeed, there is a shift of spectral peaks towards low wavenumbers, but since helicity is not conserved, and in contrast with the vortex-dynamics case, the peak levels are decaying instead of increasing. Hence, it was the inviscid nature of our vortex-dynamical system that enabled the unambiguous demonstration of the inverse helicity cascade. This was achieved with a low computational complexity calculation, that required significantly smaller processing and memory capacities than the Navier-Stokes computation.

Conclusion
Vortex links are destroyed by reconnections which are facilitated by viscous diffusion that allows vortex lines to slip past each other. A byproduct of this process is the dissipation of energy and helicity. The energy sink is equal to − V e dx, with e = 2νS ij S ij which for an unbounded system becomes e = νω · ω, whilst the helicity sink is − V h dx, with h = 2νω · ∇ × ω. Since, as discussed in § 1, the conservation of helicity involves the vector product of velocity with frozen in the flow vector fields, it is reasonable to associate helicity dissipation with the diffusion of the same vector fields (here the vorticity) enabled by viscosity (Layton 2007). Notably, the sink of streamline helicity is the vortex-line helicity (times ν for dimensional book-keeping). During reconnection, vortices are stretched, so both enstrophy and e are intensified. The helicity sink has a different structure, but it too leads to a reduction of helicity. Our research suggests that disconnecting the reconnection phenomenon from its underlying physical mechanism (e.g. viscous dissipation in classical fluids, quantum stress action in quantum fluids or scissors and glue in Christmas ribbons (Pfister & Gekelman 1990)) can help understand better the experiments of Scheeler et al. (2014). Indeed, the purely topological act of reconnection conserves helicity (even if it destroys Lk) (Pfister & Gekelman 1990). On the other hand, the physical means by which reconnection is achieved could destroy some helicity as a byproduct of their action, but this ought not obfuscate the helicity-preserving nature of topological change. For example, in the classical fluid dynamics case, the short duration of high-Reynolds-number reconnection means that topological change can be achieved with small helicity destruction (since viscous dissipation does not have sufficient time to effect a sizeable reduction). Our calculations support these conclusions in two different ways: (a) by constructing, via the vortex-dynamics model of non-dissipative reconnections, a direct vortex analogue of the purely topological case of Pfister & Gekelman (1990), and indicating that helicity tends to be preserved in this case, and (b) by solving the Navier-Stokes equations for a smaller Reynolds number, demonstrating that viscous reduction of helicity is just a secondary side effect of the reconnection process, which conceals the fundamental helicity-preserving nature of topological reconnections. This concealment becomes more and more feeble as the Reynolds number increases, until, in our idealized vortex-dynamical computation, it becomes negligible as we reach the limit of purely topological change.
Our calculation indicates a transformation of pre-reconnection Lk to post-reconnection Wr. In this way, it is in full agreement with the experimental results of Scheeler et al. (2014). Interestingly, the constant pre-reconnection Lk values correspond to significant helicity spectrum dynamics, which conserve (in the inviscid limit) topology whilst eliminating small-scale helicity. The inverse helicity cascade computed here differs from the direct helicity cascade reported in the statistics of homogeneous, isotropic turbulence (Biferale, Musacchio & Toschi 2013). To understand this result better, we note that the computed helicity spectrum of a link composed of single line vortices shows (progressively decaying) fast, sign-changing variations at all scales. Similar in origin to energy spectrum ringing in vortex rings, these fluctuations are due to the potential flow around the line vortices, since they are eliminated at subcore length scales, when we replace lines with tubes. Similar helicity spectrum oscillations were observed for two perpendicular thin slabs of magnetic flux (Asgari-Targhi & Berger 2009). The key observation here is that, at every finite-scale interval, there is only a small net amount of helicity, as compared with the actual fluctuation amplitude. This is because there is a gradual reduction of the amplitude as we move towards smaller scales. These remarkable small-scale variations in the spectrum are directly related to the perfect-circle geometry of line vortices, and they disappear once the rings are deformed by Biot-Savart effects on the route to reconnection. However, since helicity is conserved, and the small-scale helicity associated with the perfect-circle geometry is destroyed as the rings become non-circular, the small-scale helicity needs to be transferred to larger scales. More concisely, small-scale helicity is associated with perfect-circle geometry and very small vortex cores, and as the geometry is altered on the route to reconnection whilst global helicity is conserved, the only physically viable process is for helicity to accumulate at large scales. The post-reconnection inverse helicity cascade has possibly important implications for the structure of turbulence. Indeed, the magnification of u · ω at large scales implies the weakening of the Lamb force u × ω, which is responsible for the nonlinearity of turbulence and the turbulence cascade. Perhaps some turbulent coherent structures are the remnants of reconnection-induced destructions of linked vortex rings. Thus, the post-reconnection dynamics could be associated with the formation of turbulent coherent structures and the inhibition of the direct energy cascade.
This work could be continued along various directions. It would be interesting, for example, to investigate the topological and helicity dynamics of magnetohydrodynamic vortex links. Such studies would significantly expand previous vortex-dynamical magnetohydrodynamic investigations (Kivotides 2018a(Kivotides , 2019. Another important problem is the topological and helicity dynamics of vortex knots, and possible connections between topology and energy and helicity spectra there, in conjunction with advanced topological measures including knot polynomials (Liu & Ricca 2015;Cooper et al. 2019) and Vassiliev invariants.
Declaration of interests. The authors report no conflict of interest.