On the Distribution of 2-Selmer ranks of Quadratic Twists of Elliptic Curves over $\mathbb{Q}$

Abstract: We characterize the distribution of 2-Selmer ranks of quadratic twists of elliptic curves over $\mathbb{Q}$ with full rational 2-torsion. We propose a new type of random alternating matrix model $M_{,\mathbf t}^{\mathrm{Alt}}(\mathbb{F}_2)$ over $\mathbb{F}2$ with 0, 1 or 2 holes'', with associated Markov chains, described by parameter $\mathbf t=(t_1,\cdots,t_s)\in\mathbb{Z}^s$ where $s$ is the number ofholes''. We proved that for each equivalence classes of quadratic twists of elliptic curves: (1) The distribution of 2-Selmer ranks agrees with the distribution of coranks of matrices in $M{,\mathbf t}^{\mathrm{Alt}}(\mathbb{F}_2)$; (2) The moments of 2-Selmer groups agree with that of $M_{,\mathbf t}^{\mathrm{Alt}}(\mathbb{F}_2)$, in particular, the average order of essential 2-Selmer groups is $3+\sum_i2^{t_i}$. Our work extends the works of Heath-Brown, Swinnerton-Dyer, Kane, and Klagsbrun-Mazur-Rubin where the matrix only has 0 ``holes'', the matrix model is the usual random alternating matrix model, and the average order of essential 2-Selmer groups is 3. A new phenomenon is that different equivalence classes in the same quadratic twist family could have different parameters, hence have different distribution of 2-Selmer ranks. The irreducible property of the Markov chain associated to $M_{,\mathbf t}^{\mathrm{Alt}}(\mathbb{F}_2)$ gives the positive density results on the distribution of 2-Selmer ranks.