Ruling polynomials and augmentations over finite fields
Abstract
For any Legendrian link, L, in (3, (dz-y\,dx)) we define invariants, Augm(L,q), as normalized counts of augmentations from the Legendrian contact homology DGA of L into a finite field of order q where the parameter m is a divisor of twice the rotation number of L. Generalizing a result of Ng and Sabloff for the case q =2, we show the augmentation numbers, Augm(L,q), are determined by specializing the m-graded ruling polynomial, RmL(z), at z = q1/2-q-1/2. As a corollary, we deduce that the ruling polynomials are determined by the Legendrian contact homology DGA.
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