{"payload":{"header_redesign_enabled":false,"results":[{"id":"188323485","archived":false,"color":"#3572A5","followers":329,"has_funding_file":false,"hl_name":"fancompute/ceviche","hl_trunc_description":"🦐 Electromagnetic Simulation + Automatic Differentiation ","language":"Python","mirror":false,"owned_by_organization":true,"public":true,"repo":{"repository":{"id":188323485,"name":"ceviche","owner_id":4473810,"owner_login":"fancompute","updated_at":"2023-07-06T21:35:53.326Z","has_issues":true}},"sponsorable":false,"topics":["optimization","fdtd","electromagnetics","inverse-problems","adjoint","fdfd"],"type":"Public","help_wanted_issues_count":0,"good_first_issue_issues_count":0,"starred_by_current_user":false},{"id":"142919590","archived":false,"color":"#3572A5","followers":157,"has_funding_file":false,"hl_name":"fancompute/angler","hl_trunc_description":"Frequency-domain photonic simulation and inverse design optimization for linear and nonlinear devices","language":"Python","mirror":false,"owned_by_organization":true,"public":true,"repo":{"repository":{"id":142919590,"name":"angler","owner_id":4473810,"owner_login":"fancompute","updated_at":"2019-12-14T13:10:50.411Z","has_issues":true}},"sponsorable":false,"topics":["simulation","optimization","solver","optics","sensitivity-analysis","inverse-problems","frequency-domain","electromagnetic","mkl","adjoint","photonics","adjoint-sensitivities","fdfd","nonlinear-devices"],"type":"Public","help_wanted_issues_count":5,"good_first_issue_issues_count":3,"starred_by_current_user":false},{"id":"123981196","archived":false,"color":"#DA5B0B","followers":56,"has_funding_file":false,"hl_name":"fancompute/fdfdpy","hl_trunc_description":"Pure Python implementation of the finite difference frequency domain (FDFD) method for electromagnetics","language":"Jupyter Notebook","mirror":false,"owned_by_organization":true,"public":true,"repo":{"repository":{"id":123981196,"name":"fdfdpy","owner_id":4473810,"owner_login":"fancompute","updated_at":"2018-11-05T22:12:15.187Z","has_issues":true}},"sponsorable":false,"topics":["optics","eigenvectors","finite-difference","electromagnetics","frequency-domain","eigenvalues","fdfd","modal-calculations","python-fdfd"],"type":"Public","help_wanted_issues_count":0,"good_first_issue_issues_count":0,"starred_by_current_user":false},{"id":"125162608","archived":false,"color":"#DA5B0B","followers":32,"has_funding_file":false,"hl_name":"fancompute/FDFD.jl","hl_trunc_description":"Pure Julia implementation of the finite difference frequency domain (FDFD) method for electromagnetics","language":"Jupyter Notebook","mirror":false,"owned_by_organization":true,"public":true,"repo":{"repository":{"id":125162608,"name":"FDFD.jl","owner_id":4473810,"owner_login":"fancompute","updated_at":"2021-01-01T21:14:49.553Z","has_issues":true}},"sponsorable":false,"topics":["julia","optics","electromagnetics","frequency-domain","fdfd","waveguide","finite-difference-method","eigenmode","nanophotonics"],"type":"Public","help_wanted_issues_count":0,"good_first_issue_issues_count":0,"starred_by_current_user":false}],"type":"repositories","page":1,"page_count":1,"elapsed_millis":108,"errors":[],"result_count":4,"facets":[{"kind":"FACET_KIND_LANGUAGE","entries":[{"name":"Jupyter Notebook","language_color":"#DA5B0B","query":"language:Jupyter Notebook"},{"name":"Python","language_color":"#3572A5","query":"language:Python"}]}],"protected_org_logins":[],"topics":null,"query_id":"","logged_in":false,"sign_up_path":"/signup?source=code_search_results","sign_in_path":"/login?return_to=https%3A%2F%2Fgithub.com%2Fsearch%3Fq%3Dtopic%253Afdfd%2Borg%253Afancompute%2Bfork%253Atrue%26type%3Drepositories","metadata":null,"warn_limited_results":false,"csrf_tokens":{"/fancompute/ceviche/star":{"post":"lioxPwzRQHbMN7ZShxhyC_d69TzEHITNb_DNh_81QyN101bpFTI1ANzk68FwJmjD79Crugg6jeQFbepnIKRZYw"},"/fancompute/ceviche/unstar":{"post":"rp1eYMbyNUbAIF2IuBzogDyULhv9UKmG6pZhedgSE9i0EthA3ZdHu4xdWWxyGXSbtDPEKqE55TyDTtNIKerVrA"},"/fancompute/angler/star":{"post":"SX8i8A8BzqDc_3ggPNcLeR3aFZXKlrcEmDcPNXBiCAAughgbyuwoAMFL2y-CqpPxWPyGLaFoUVeZRVkKdWpRUA"},"/fancompute/angler/unstar":{"post":"HokhWHsXteriyC3AjJT9hfOORihrvt5pOIab9PKtnTj8eoR-kn00Cnn34Q6wAfLHaaI7749M_YFoObmw3XTYMg"},"/fancompute/fdfdpy/star":{"post":"6wpegRh4Nr8nisnJqtKJnTf-VnpCPeCuuz3Lbm1XzjuM-64P6d3MRrz-FVIo9PPX--wUz5FIy49K19NkK9RVhw"},"/fancompute/fdfdpy/unstar":{"post":"zupUkUHcmtSm_2I_kZGKpuf7dIIiySFMN9bgaEWAkM_TqeqM_FTIfsoW8REEgcZ7r6Rtma7Jy4Y6XMTzhxzP9g"},"/fancompute/FDFD.jl/star":{"post":"BBD6-HYRFUFyjn9zzFgwe-LwGEHF27vpP3NduI9srVztYfthF3iNRFciOsXksVZfQUfu48oTveiEznl94RrxJw"},"/fancompute/FDFD.jl/unstar":{"post":"6L57N5u-mJRJ_h0Y63ZHYnlGnNJDkcuI2vHFPUSl3DFbkkFV3wNmDDyZJs5LoHUXljtkbIHdH1Zh-l1S7UXWDQ"},"/sponsors/batch_deferred_sponsor_buttons":{"post":"KFPx_ClmZjKUIOUZea8oMVAGJHltn_JWgpsRsALhvGsf6ILuXTkEjvtDT4pYWRtN2TcQc1FEzRrce6VuzOPgxQ"}}},"title":"Repository search results"}