A dimer view on Fox's trapezoidal conjecture
Authors
Karola Mészáros, Melissa Sherman-Bennett, Alexander Vidinas
Categories
Abstract
Fox's conjecture (1962) states that the sequence of absolute values of the coefficients of the Alexander polynomial of alternating links is trapezoidal. While the conjecture remains open in general, a number of special cases have been settled, some, quite recently: Fox's conjecture was shown to hold for special alternating links by Hafner, Mészáros, and Vidinas (2023) and for certain diagrammatic Murasugi sums of special alternating links by Azarpendar, Juhász, and Kálmán (2024). Any alternating link can be written as a diagrammatic Murasugi sums of special alternating links; thus, if one could remove the certain adjective in the previous result, it would settle Fox's conjecture. In this paper, we give an alternative proof of Azarpendar, Juhász, and Kálmán's aforementioned result via a dimer model for the Alexander polynomial. In doing so, we not only obtain a significantly shorter proof of Azarpendar, Juhász, and Kálmán's result than the original, but we also obtain several theorems of independent interest regarding the Alexander polynomial, which are readily visible from the dimer point of view. Moreover, we explain, backed with computational evidence, why our result is only for certain diagrammatic Murasugi sums of special alternating links as opposed to all. While the latter does not settle an open question, it strikes us as important to bring to attention, given the interest in finding a solution to Fox's conjecture.
A dimer view on Fox's trapezoidal conjecture
Categories
Abstract
Fox's conjecture (1962) states that the sequence of absolute values of the coefficients of the Alexander polynomial of alternating links is trapezoidal. While the conjecture remains open in general, a number of special cases have been settled, some, quite recently: Fox's conjecture was shown to hold for special alternating links by Hafner, Mészáros, and Vidinas (2023) and for certain diagrammatic Murasugi sums of special alternating links by Azarpendar, Juhász, and Kálmán (2024). Any alternating link can be written as a diagrammatic Murasugi sums of special alternating links; thus, if one could remove the certain adjective in the previous result, it would settle Fox's conjecture. In this paper, we give an alternative proof of Azarpendar, Juhász, and Kálmán's aforementioned result via a dimer model for the Alexander polynomial. In doing so, we not only obtain a significantly shorter proof of Azarpendar, Juhász, and Kálmán's result than the original, but we also obtain several theorems of independent interest regarding the Alexander polynomial, which are readily visible from the dimer point of view. Moreover, we explain, backed with computational evidence, why our result is only for certain diagrammatic Murasugi sums of special alternating links as opposed to all. While the latter does not settle an open question, it strikes us as important to bring to attention, given the interest in finding a solution to Fox's conjecture.
Authors
Karola Mészáros, Melissa Sherman-Bennett, Alexander Vidinas
Click to preview the PDF directly in your browser