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Apr 05, 2024 320 likes •626 views

trts t Prt Prt t str tt r r

SLIDE 1

❖✉t❣r♦✇t❤s ♦❢ t❤❡ ❉▲▼❋ Pr♦❥❡❝t✿ P❛rt ✷✿ ◆■❙❚ ❉✐❣✐t❛❧ ❘❡♣♦s✐t♦r② ♦❢ ▼❛t❤❡♠❛t✐❝❛❧ ❋♦r♠✉❧❛❡

❍♦✇❛r❞ ❈♦❤❧✯✱ ▼❛r❥❡ ▼❝❈❧❛✐♥✯✱ ❇♦♥✐t❛ ❙❛✉♥❞❡rs✯✱ ▼♦r✐t③ ❙❝❤✉❜♦t③§

✯❆♣♣❧✐❡❞ ❛♥❞ ❈♦♠♣✉t❛t✐♦♥❛❧ ▼❛t❤❡♠❛t✐❝s ❉✐✈✐s✐♦♥✱ ◆■❙❚✱ ●❛✐t❤❡rs❜✉r❣✱ ▼❛r②❧❛♥❞✱ ❯✳❙✳❆✳ §❉❛t❛❜❛s❡ ❙②st❡♠s ❛♥❞ ■♥❢♦r♠❛t✐♦♥ ▼❛♥❛❣❡♠❡♥t ●r♦✉♣✱ ❚❡❝❤♥✐s❝❤❡ ❯♥✐✈❡rs✐tät ❇❡r❧✐♥

❈❤❛❧❧❡♥❣❡s ✐♥ ✷✶st ❈❡♥t✉r②✿ ❊①♣❡r✐♠❡♥t❛❧ ▼❛t❤❡♠❛t✐❝❛❧ ❈♦♠♣✉t❛t✐♦♥ ■♥st✐t✉t❡ ❢♦r ❈♦♠♣✉t❛t✐♦♥❛❧ ❛♥❞ ❊①♣❡r✐♠❡♥t❛❧ ❘❡s❡❛r❝❤ ✐♥ ▼❛t❤❡♠❛t✐❝s✱ Pr♦✈✐❞❡♥❝❡✱ ❘❤♦❞❡ ■s❧❛♥❞

❏✉❧② ✷✶✱ ✷✵✶✹

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✶ ✴ ✶✸

SLIDE 2

❉✐❣✐t❛❧ ❘❡♣♦s✐t♦r② ♦❢ ▼❛t❤❡♠❛t✐❝❛❧ ❋♦r♠✉❧❛❡

❖♥❧✐♥❡ ❝♦♠♣❡♥❞✐✉♠ ♦❢ ♠❛t❤❡♠❛t✐❝❛❧ ❢♦r♠✉❧❛❡

♦rt❤♦❣♦♥❛❧ ♣♦❧②♥♦♠✐❛❧ ❛♥❞ s♣❡❝✐❛❧ ❢✉♥❝t✐♦♥ ❢♦r♠✉❧❛❡

❉❘▼❋ ❛tt❡♠♣ts t♦ ✉s❡ ❲❡❜ ✷✳✵ t❡❝❤♥♦❧♦❣✐❡s t♦ ♠♦✈❡ ❜❡②♦♥❞ t❤❡ st❛t✐❝ ♣r❡s❡♥t❛t✐♦♥ ♦❢ r❡❢❡r❡♥❝❡ ❞❛t❛ t♦ ❛ ♣❧❛t❢♦r♠ t❤❛t ❡♥❝♦✉r❛❣❡s ❝♦♠♠✉♥✐t② ✐♥t❡r❛❝t✐♦♥ ❛♥❞ ❝♦❧❧❛❜♦r❛t✐♦♥✳ ❉❘▼❋ ✉t✐❧✐③❡s ♦❢ ❉▲▼❋ ▲

❆

❚ ❊❳ ♠❛❝r♦s

t✐❡ s♣❡❝✐✜❝ ❝❤❛r❛❝t❡r s❡q✉❡♥❝❡s t♦ ✇❡❧❧✲❞❡✜♥❡❞ ♠❛t❤❡♠❛t✐❝❛❧ ♦❜❥❡❝ts✳ Pr♦✈✐❞❡s ❛♥ ✐♥t❡r♥❡t ❧✐♥❦ t♦ st❛♥❞❛r❞✱ ♣r❡❝✐s❡ ♦rt❤♦❣♦♥❛❧ ♣♦❧②♥♦♠✐❛❧ ❛♥❞ s♣❡❝✐❛❧ ❢✉♥❝t✐♦♥ ❞❡✜♥✐t✐♦♥s t❤r♦✉❣❤ t❤❡ ❉▲▼❋ ❛♥❞ ❉❘▼❋

❯s❡s ▼❡❞✐❛❲✐❦✐ ✇✐❦✐ s♦❢t✇❛r❡

▼❛t❤▼▲ s✉♣♣♦rt ▲

❆

❚ ❊❳▼▲ ▼❛t❤❏❛①

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✷ ✴ ✶✸

SLIDE 3

❉❘▼❋ ❣♦❛❧s

❚❤❡ ❉❘▼❋ ✇✐❧❧ ❜❡ ❞❡s✐❣♥❡❞ ❢♦r ❛ ♠❛t❤❡♠❛t✐❝❛❧❧② ❧✐t❡r❛t❡ ❛✉❞✐❡♥❝❡ ❛♥❞ s❤♦✉❧❞✿

✶ ❢❛❝✐❧✐t❛t❡ ✐♥t❡r❛❝t✐♦♥ ❛♠♦♥❣ ❛ ❝♦♠♠✉♥✐t② ♦❢ ♠❛t❤❡♠❛t✐❝✐❛♥s ❛♥❞

s❝✐❡♥t✐sts ✐♥t❡r❡st❡❞ ✐♥ ❢♦r♠✉❧❛❡ ❞❛t❛ r❡❧❛t❡❞ t♦ ♦rt❤♦❣♦♥❛❧ ♣♦❧②♥♦♠✐❛❧s ❛♥❞ s♣❡❝✐❛❧ ❢✉♥❝t✐♦♥s ✭❖P❙❋✮❀

✷ ❜❡ ❡①♣❛♥❞❛❜❧❡✱ ❛❧❧♦✇✐♥❣ t❤❡ ✐♥♣✉t ♦❢ ♥❡✇ ❢♦r♠✉❧❛❡❀ ✸ ❜❡ ❛❝❝❡ss✐❜❧❡ ❛s ❛ st❛♥❞❛❧♦♥❡ r❡s♦✉r❝❡❀ ✹ ❤❛✈❡ ❛ ✉s❡r ❢r✐❡♥❞❧②✱ ❝♦♥s✐st❡♥t✱ ❛♥❞ ❤②♣❡r❧✐♥❦❛❜❧❡ ✈✐❡✇♣♦✐♥t ❛♥❞

❛✉t❤♦r✐♥❣ ♣❡rs♣❡❝t✐✈❡❀ ❛♥❞

✺ ❝♦♥t❛✐♥ ❡❛s✐❧② s❡❛r❝❤❛❜❧❡ ♠❛t❤❡♠❛t✐❝s ❛♥❞ t❛❦❡ ❛❞✈❛♥t❛❣❡ ♦❢

♠♦❞❡r♥ ▼❛t❤▼▲ t♦♦❧s ❢♦r ❡❛s② t♦ r❡❛❞✱ s❝❛❧❛❜❧② r❡♥❞❡r❡❞ ♠❛t❤❡♠❛t✐❝s✳

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✸ ✴ ✶✸

SLIDE 4

❉❘▼❋ ❙❡❡❞✐♥❣ Pr♦❥❡❝ts ▼❛t❤ ❖❈❘✱ ▼❛❝r♦ r❡♣❧❛❝❡♠❡♥t✱ ❛♥❞ ❲✐❦✐t❡①t ❣❡♥❡r❛t✐♦♥✱ t♦ ✐♠♣❧❡♠❡♥t ♣r❡✲❡①✐st✐♥❣ ❜♦♦❦ ❝♦♠♣❡♥❞✐❛

▼❛t❤❡♠❛t✐❝❛❧ ❖♣t✐❝❛❧ ❈❤❛r❛❝t❡r ❘❡❝♦❣♥✐t✐♦♥ ♣r♦❥❡❝t

❇❛t❡♠❛♥ ♠❛♥✉s❝r✐♣t ♣r♦❥❡❝t✿ ❍✐❣❤❡r ❚r❛♥s❝❡♥❞❡♥t❛❧ ❋✉♥❝t✐♦♥s✱ ❚❛❜❧❡s ♦❢ ■♥t❡❣r❛❧ ❚r❛♥s❢♦r♠s ❇②r❞ ✫ ❋r✐❡❞♠❛♥✬s ❍❛♥❞❜♦♦❦ ♦❢ ❊❧❧✐♣t✐❝ ■♥t❡❣r❛❧s ❢♦r ❊♥❣✐♥❡❡rs ❛♥❞ ❙❝✐❡♥t✐sts

❉▲▼❋ ▲

❆

❚ ❊❳ ♠❛❝r♦ r❡♣❧❛❝❡♠❡♥t ♣r♦❥❡❝t

❍②♣❡r❣❡♦♠❡tr✐❝ ❖rt❤♦❣♦♥❛❧ P♦❧②♥♦♠✐❛❧s ❛♥❞ ❚❤❡✐r q✲❆♥❛❧♦❣✉❡s ✕ ❑▲❙ ❑▲❙ ❛❞❞❡♥❞✉♠ ❜② ❚♦♠ ❑♦♦r♥✇✐♥❞❡r ❢✉t✉r❡❄✿ ❆♥❞r❡✇s✱ ❆s❦❡② ✫ ❘♦② ✿ ❙♣❡❝✐❛❧ ❋✉♥❝t✐♦♥s ❢✉t✉r❡❄✿ ■s♠❛✐❧ ✿ ❈❧❛ss✐❝❛❧ ❛♥❞ ◗✉❛♥t✉♠ ❖rt❤♦❣♦♥❛❧ P♦❧②♥♦♠✐❛❧s ✐♥ ❖♥❡ ❱❛r✐❛❜❧❡ ❢✉t✉r❡❄✿ ❡t❝✳

❲✐❦✐t❡①t ❣❡♥❡r❛t✐♦♥ ♣r♦❥❡❝t

◆■❙❚ ❉✐❣✐t❛❧ ▲✐❜r❛r② ♦❢ ▼❛t❤❡♠❛t✐❝❛❧ ❋✉♥❝t✐♦♥s ✭❝❤✳ ✷✺✮ ✿ ✶✼✵ ❢♦r♠✉❧❛s

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✹ ✴ ✶✸

SLIDE 5

❉❘▼❋ ❩❡t❛ ❛♥❞ ❘❡❧❛t❡❞ ❋✉♥❝t✐♦♥s P❛❣❡ ✳✳✳ ❉▲▼❋ ❲✐❦✐t❡①t

· · · · · · · · · · · · · · · · · ·

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✺ ✴ ✶✸

SLIDE 6

❉▲▼❋ ♠❛❝r♦s ♣r♦✈✐❞❡ s❡♠❛♥t✐❝ ❝♦♥t❡♥t ✐♥ ❢♦r♠✉❧❛s

❉▲▼❋ ❖P❙❋ ▼❛❝r♦s ✈✐❛ ▲

❆

❚ ❊❳▼▲✲s❡r✈❡r

✺✹✻ s❡♠❛♥t✐❝ ❉▲▼❋ ▲

❆❚

❊❳ ❖P❙❋ ♠❛❝r♦s ❛❞❞✐t✐♦♥❛❧ ✸✽ s❡♠❛♥t✐❝ ▲

❆

❚ ❊❳ ♠❛❝r♦s

❖❜❥❡❝ts✿ ❭s✉♠✱❭✐♥t✱❭❞❡r✐✈④❢⑥④①⑥✱❭q❞❡r✐✈❬♥❪④q⑥❅④③⑥ ❈♦♥st❛♥ts✿ ❭❡①♣❡✱❭✐✉♥✐t✱❭❝♣✐✱❭❊✉❧❡r❈♦♥st❛♥t ❙♣❡❝✐❛❧ ❋✉♥❝t✐♦♥s ❛♥❞ ❖rt❤♦❣♦♥❛❧ P♦❧②♥♦♠✐❛❧s

Γ(z) ❭❊✉❧❡r●❛♠♠❛❅④③⑥ ❤tt♣✿✴✴❞❧♠❢✳♥✐st✳❣♦✈✴✺✳✸✵★❊✶ Jν(z) ❭❇❡ss❡❧❏④❭♥✉⑥❅④③⑥ ❤tt♣✿✴✴❞❧♠❢✳♥✐st✳❣♦✈✴✶✵✳✷★❊✷ Qµ

ν(z)

❭▲❡❣❡♥❞r❡◗❬❭♠✉❪④❭♥✉⑥❅④③⑥✿ ❤tt♣✿✴✴❞❧♠❢✳♥✐st✳❣♦✈✴✶✹✳✸★❊✼ P (α,β)

(x) ❭❏❛❝♦❜✐P④❭❛❧♣❤❛⑥④❭❜❡t❛⑥④♥⑥❅④①⑥ ❤tt♣✿✴✴❞❧♠❢✳♥✐st✳❣♦✈✴✶✽✳✸★❚✶✳t✶✳r✸

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✻ ✴ ✶✸

SLIDE 7

▼❛t❤❡♠❛t✐❝❛❧ ❋♦r♠✉❧❛❡

❲❤❡r❡❛s ❲✐❦✐♣❡❞✐❛ ❛♥❞ ♦t❤❡r ✇❡❜ ❛✉t❤♦r✐♥❣ t♦♦❧s ♠❛♥✐❢❡st ♥♦t✐♦♥s ♦r ❞❡s❝r✐♣t✐♦♥s ❛s ✜rst ❝❧❛ss ♦❜❥❡❝ts✱ t❤❡ ❉❘▼❋ ❞♦❡s t❤❛t ✇✐t❤ ♠❛t❤❡♠❛t✐❝❛❧ ❢♦r♠✉❧❛❡✳ ❉❘▼❋ ♣r♦✈✐❞❡s ❢♦r ❡❛❝❤ ❢♦r♠✉❧❛✱ ❛ ❢♦r♠✉❧❛ ❤♦♠❡ ♣❛❣❡✿

✶ ❘❡♥❞❡r❡❞ ❞❡s❝r✐♣t✐♦♥ ♦❢ t❤❡ ❢♦r♠✉❧❛ ✭r❡q✉✐r❡❞✮❀ ✷ ❈♦♥str❛✐♥ts t❤❡ ❢♦r♠✉❧❛ ♠✉st ♦❜❡② ✸ ❙✉❜st✐t✉t✐♦♥s r❡q✉✐r❡❞ t♦ ✉♥❞❡rst❛♥❞ ❢♦r♠✉❧❛❀ ✹ ❇✐❜❧✐♦❣r❛♣❤✐❝ ❝✐t❛t✐♦♥ ✭r❡q✉✐r❡❞✮❀ ✺ ❖♣❡♥ s❡❝t✐♦♥ ❢♦r ♣r♦♦❢s ✭r❡q✉✐r❡❞✮ ✕ ❉▲▼❋❀ ✻ ▲✐st ♦❢ s②♠❜♦❧s ❛♥❞ ❧✐♥❦s t♦ ❞❡✜♥✐t✐♦♥s ✭r❡q✉✐r❡❞✮ ✕ ❉▲▼❋ ♠❛❝r♦s❀ ✼ ❖♣❡♥ s❡❝t✐♦♥ ❢♦r ♥♦t❡s ✕ ❝♦♥♥❡❝t✐♦♥s ❜❡t✇❡❡♥ ❢♦r♠✉❧❛s❀ ❛♥❞ ✽ ❖♣❡♥ s❡❝t✐♦♥ ❢♦r ❡①t❡r♥❛❧ ❧✐♥❦s ✕ ❝♦♠♣✉t❡r ❣❡♥❡r❛t❡❞ ♣r♦♦❢s❀

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✼ ✴ ✶✸

SLIDE 8

❙❛♠♣❧❡ ❢♦r♠✉❧❛ ❤♦♠❡ ♣❛❣❡

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✽ ✴ ✶✸

SLIDE 9

❋✉rt❤❡r q✉❡st✐♦♥s

❍♦✇ ❞♦❡s ♦♥❡ ❢❛❝✐❧✐t❛t❡ ❡✛❡❝t✐✈❡ ❝♦♠♠✉♥✐t② ✐♥t❡r❛❝t✐♦♥ ✫ ❝♦♥tr✐❜✉t✐♦♥ ✇✐t❤ s✉❝❤ ❛ r❡s♦✉r❝❡❄

✐♠♣❧❡♠❡♥t ❛ ❤✐❣❤ ❞❡❣r❡❡ ♦❢ ❝♦♠♣✉t❡r ✈❡r✐✜❝❛t✐♦♥ ♦❢ ❝♦♠♠✉♥✐t② ✐♥♣✉t ❡♥s✉r❡ ❛ ❞❡❣r❡❡ ♦❢ ♠♦❞❡r❛t✐♦♥ ✐♥ t❤❡ ✇✐❦✐

❈❛♥ ♦♥❡ ❜✉✐❧❞ ❛ ♣✐❡❝❡ ♦❢ ✐♥t❡❧❧✐❣❡♥t s♦❢t✇❛r❡ ✇❤✐❝❤ ✐s ❛❜❧❡ t♦

s❝❛♥ ✐♥ ❜♦♦❦s❀ ♣r♦❞✉❝❡s ▲

❆

❚ ❊❳ s♦✉r❝❡❀ r❡♣❧❛❝❡s ❝♦♠♠❛♥❞s ❢♦r ❢✉♥❝t✐♦♥s ✐♥ t❤❡ s♦✉r❝❡ ✇✐t❤ s❡♠❛♥t✐❝ ♠❛❝r♦s❀ ❡①tr❛❝ts ❞❛t❛ ❢r♦♠ t❤❡ t❡①t ✭s✉❝❤ ❛s ❝♦♥str❛✐♥ts✮ ❛ss♦❝✐❛t❡s ❞❛t❛ ✇✐t❤ r❡❧❡✈❛♥t ❢♦r♠✉❧❛❡ ❛♥❞ r❡♠♦✈❡s t❡①t❀ ♣r♦❞✉❝❡s ❲✐❦✐t❡①t❀ ❛♥❞ ✉♣❧♦❛❞s ❲✐❦✐t❡①t t♦ ❛ ♣✉❜❧✐❝❧② ❛❝❝❡ss✐❜❧❡ ✇❡❜s✐t❡❄

❍♦✇ ❞♦❡s ♦♥❡ s❡❛r❝❤ t❤❡ r❡s✉❧t✐♥❣ ♠❛t❤❡♠❛t✐❝❛❧ ❞❛t❛❜❛s❡❄

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✾ ✴ ✶✸

SLIDE 10

❖♥❣♦✐♥❣ ♣r♦❥❡❝ts t♦ ✐♥✈❡st✐❣❛t❡ t❤❡ ❛❜♦✈❡ q✉❡st✐♦♥s

▼❛❝r♦ r❡♣❧❛❝❡♠❡♥ts ❢r♦♠ ✇❡❧❧✲❝♦♥str✉❝t❡❞ ▲

❆❚

❊❳ s♦✉r❝❡ ❊①tr❛❝t✐♦♥ ♦❢ ♠❛t❤❡♠❛t✐❝❛❧ ❞❛t❛ ❢r♦♠ t❡①t ✭❦❡②✇♦r❞s✮ ❲✐❦✐t❡①t ❣❡♥❡r❛t✐♦♥ P♦rt✐♥❣ t❤❡ ❉▲▼❋ s❡❛r❝❤ ❡♥❣✐♥❡ ✐♥ ▼❡❞✐❛❲✐❦✐ ✭❉❘▼❋✮ ❖✉t♣✉t ♦❢ ❢♦r♠✉❧❛ ❞❛t❛ ❢r♦♠ r✐❣❤t✲❝❧✐❝❦❛❜❧❡ ♠❡♥✉s ✐♥ ❛ ✈❛r✐❡t② ♦❢ ❢♦r♠❛ts s♦ t❤❛t ❢♦r♠✉❧❛s ❝❛♥ ❜❡ ✉s❡❞ ❛♥❞ ❛❧s♦ ✈❡r✐✜❡❞

▲

❆❚

❊❳ ❡①♣❛♥❞❡❞ ▲

❆❚

❊❳ s❡♠❛♥t✐❝ ♣r❡s❡♥t❛t✐♦♥ ▼❛t❤▼▲ ❝♦♥t❡♥t ▼❛t❤▼▲ ▼❛t❤❡♠❛t✐❝❛ ▼❛♣❧❡ ❙❛❣❡

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✶✵ ✴ ✶✸

SLIDE 11

❱✐rt✉❛❧ ♠❛❝❤✐♥❡s ❱✐rt✉❛❧ ▼❛❝❤✐♥❡ ■♥st❛♥❝❡s✿ ❳❙❊❉❊ ♣r♦❥❡❝t ✷ ❳❙❊❉❊ ❈❡♥t❖❙✿ ❞❡♠♦ ❛♥❞ ❞❡♣❧♦②♠❡♥t ✷ ❳❙❊❉❊ ❯❜✉♥t✉ s❡r✈❡r✿ ▲

❆

❚ ❊❳▼▲✱ ▼❛t❤♦✐❞ ❲✐❦✐♠❡❞✐❛ ❋♦✉♥❞❛t✐♦♥ ✕ ❲✐❦✐t❡❝❤ ✹ ❲▼❋ ❱❛❣r❛♥t ✐♥st❛♥❝❡s

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✶✶ ✴ ✶✸

SLIDE 12

❆❝❦♥♦✇❧❡❞❣❡♠❡♥ts ▼♦r✐t③ ❙❝❤✉❜♦t③ ✭❚❯✲❇❡r❧✐♥✮✿ ▼❡❞✐❛❲✐❦✐ ▼❛t❤ ❇r✉❝❡ ▼✐❧❧❡r ✭◆■❙❚✮ ✿ ❉▲▼❋ ▼❛❝r♦s ❏❛♥❡❧❧❡ ❲✐❧❧✐❛♠s ✭❱❙❯✮ ✿ ✷✵✶✸ ❙❯❘❋ st✉❞❡♥t ❍✐❣❤ ❙❝❤♦♦❧ ❙t✉❞❡♥ts✿ ❏❛❦❡ ▼✐❣❞❛❧❧ ✕ ▼❛t❤❏❛① ♠❡♥✉ ❝✉st♦♠✐③❛t✐♦♥ ❈❤❡rr② ❩♦✉ ✕ s❡❡❞✐♥❣✴♠❛❝r♦ r❡♣❧❛❝❡♠❡♥t ❆❧❡① ❉❛♥♦✛ ✕ s❡❡❞✐♥❣✴♠❛❝r♦ r❡♣❧❛❝❡♠❡♥t ❆♠❜❡r ▲✐✉ ✕ ▼❛t❤❏❛① ♠❡♥✉ ❝✉st♦♠✐③❛t✐♦♥ ❏✐♠♠② ▲✐ ✕ ♠❛t❤❡♠❛t✐❝❛❧ s❡❛r❝❤

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✶✷ ✴ ✶✸

SLIDE 13

P♦st❡r s❡ss✐♦♥ ✇✐t❤ ✇❡❜s✐t❡ ❞❡♠♦s ✿ ❲❡❞✳ ❡✈❡♥✐♥❣

NIST Digital Repository

f Mathematical Formulae (DRMF)

Howard S. Cohl*, Marjorie A. McClain*, Bonita V. Saunders*, Moritz Schubotz§, Janelle C. Williams†

*NIST/ACMD, §Technische Universität Berlin (Germany), †Virginia State University

A digital compendium of math formulae for orthogonal polynomials and special functions and

associated math data. Uses Web 2.0 technologies to move beyond the static presentation of reference data to a platform that encourages community interaction and collaboration.

Offshoot project of NIST Digital Library of Math Functions (DLMF) using MediaWiki and MediaWiki

Math extension. Math rendering in MediaWiki using MathML. Menuing support using MathJax. MediaWiki extension development using PHP, JavaScript & Java.

Use of DLMF semantic L

A T EX macro set for special functions and orthogonal polynomials e.g., Γ(z) \EulerGamma@{z} http://dlmf.nist.gov/5.2#E1 P (α,β) n (x) \JacobiP{\alpha}{\beta}{n}@{x} http://dlmf.nist.gov/18.3#T1.t1.r3

DRMF treats formulae as first class objects, describing them in formula home pages which contain:

1 Rendered description of the formula (required); 2 Bibliographic citation (required); 3 Open section for proofs (required); 4 List of symbols and links to definitions (required); 5 Open section for notes; 6 Open section for external links; 7 Substitutions required to understand formula; and 8 Constraints the formula must obey.

Wikitext generation and semantic DLMF L

A T EX macro replacement effort using IDL & Python. 1 DLMF L A T EX macros already implemented for the DLMF Zeta chapter; 2 Hypergeometric Orthogonal Polynomials and their q-Analogues + KLS addendum. Zeta and Related Functions Page · · · · · · · · · Formula Home Page − − − − − − − − − − − − →

http://gw32.iu.xsede.org/index.php/Main_Page http://www.siam.org/meetings/opsfa13

http://www.nist.gov/itl/math https://wis.kuleuven.be/events/OPSFA/Steering Plenary Speakers:

Percy Deift, Courant Institute of Mathematical Sciences, New York University, USA
Charles F. Dunkl, University of Virginia, USA
Olga Holtz, Technische Universität Berlin, Germany
Mourad E.H. Ismail, University of Central Florida, USA
Teresa E. Pérez Fernández, Universidad de Granada, Spain
Sarah Post, University of Hawaii at Manoa, USA
Nico Temme, Centrum Wiskunde & Informatica (CWI), The Netherlands
Craig A. Tracy, University of California Davis, USA
Lauren Williams, University of California Berkeley, USA
Wadim Zudilin, The University of Newcastle, Australia
Alexei Zhedanov, Donetsk Institute for Physics and Technology, Ukraine

Themes: Orthogonal Polynomials and Special Functions, including aspects within:

classical analysis
approximation theory
continued fractions
potential theory
q-calculus
asymptotics
Riemann-Hilbert problems
random matrix theory
superintegrability and supersymmetry
integrable systems
Painlevé equations
orthogonal polynomials and special functions of several variables
orthogonal polynomials associated with root systems
spherical functions
orthogonality on the complex plane
multiple orthogonal polynomials
Sobolev orthogonal polynomials
stochastic processes

and connections to other disciplines, including:

science and industry
handbooks
numerical algorithms and tables
symbolic computation
combinatorics
number theory
theoretical physics
probability theory and statistics

Organizing Committee

Diego Dominici, State University of New York at New Paltz, USA
Daniel W. Lozier, National Institute of Standards and Technology, USA

Scientific Committee:

Richard A. Askey, University of Wisconsin, USA
Howard S. Cohl, National Institute of Standards and Technology, USA
Kathy Driver, University of Cape Town, South Africa
Tom H. Koornwinder, University of Amsterdam, The Netherlands
Robert S. Maier, University of Arizona, USA
Zeinab Mansour, King Saud University, Saudi Arabia
Andrei Martinez-Finkelshtein, Universidad de Almeria, Almeria, Spain
Willard Miller, University of Minnesota, USA
Victor H. Moll, Tulane University, USA
Adri Olde Daalhuis, The University of Edinburgh, UK
Audrey Terras, University of California San Diego, USA
Walter Van Assche, Katholieke Universiteit Leuven, Belgium
Luc Vinet, University of Montreal, Canada

✭◆■❙❚✱ ❚❯ ❇❡r❧✐♥✮ ❉❘▼❋ ❏✉❧② ✷✶✱ ✷✵✶✹ ✶✸ ✴ ✶✸

SLIDE 14

July 21, 2014 ICERM Workshop, Providence 1

Outgrowths of the Digital Library of Mathematical Functions Project Part 1

DLMF Standard Reference Tables http://dlmftables.uantwerpen.be

Daniel Lozier

NIST, Gaithersburg, MD, USA

SLIDE 15

Outline

Introduction

– DLMF – DLMF Standard Reference Tables – Algorithms and software

Examples

– Table generation – Table comparison

Acknowledgements

July 21, 2014 ICERM Workshop, Providence 2

SLIDE 16

http://dlmf.nist.gov

July 21, 2014 ICERM Workshop, Providence 4

SLIDE 17

July 21, 2014 ICERM Workshop, Providence 6

NIST Digital Library of Math Fcns

and

NIST Handbook of Math Fcns

compared to

Abramowitz and Stegun, 1964

SLIDE 18

July 21, 2014 ICERM Workshop, Providence 7

SLIDE 19

DLMF Std. Reference Tables Accurate function values on demand

Keyed to http://dlmf.nist.gov
Web input of

– Desired arguments – Desired precision

Web output of

– Enclosures computed to 5 digits higher precision

r one of 5 rounding modes at desired precision

July 21, 2014 ICERM Workshop, Providence 8

SLIDE 20

DLMF Std. Reference Tables Accuracy tests of function values from other sources

Web input of

– Arguments and function values from an external source

Web output of

– Digit-by-digit comparison – Erroneous digits shown in red – Relative error

July 21, 2014 ICERM Workshop, Providence 9

SLIDE 21

Algorithms and Software

Special functions computed to arbitrary

precision and guaranteed accuracy

Real variables, decimal or binary arithmetic
Algorithms depend on detailed error analysis

with series and continued fractions

For details see

– A. Cuyt et al, Handbook of Continued Fractions, Springer, 2008 – F. Backeljauw et al, Validated Evaluation of Special Mathematical Functions, Science of Computer Programming, v. 90A, 2014, pp. 2-20

July 21, 2014 ICERM Workshop, Providence 10

SLIDE 22

Example

table generation Bessel function , integer order, real argument

July 21, 2014 ICERM Workshop, Providence 11

) (x J n

SLIDE 23

July 21, 2014 ICERM Workshop, Providence 12

in base 10

SLIDE 24

July 21, 2014 ICERM Workshop, Providence 13

SLIDE 25

Example

July 21, 2014 ICERM Workshop, Providence 14

table comparison Matlab’s error function , real argument ) erf(x

SLIDE 26

July 21, 2014 ICERM Workshop, Providence 15

SLIDE 27

July 21, 2014 ICERM Workshop, Providence 16

SLIDE 28

Acknowledgements

Primary NIST Collaborators

– Bruce Miller – Marje McClain – Bonita Saunders

Primary Antwerp Collaborators

– Franky Backeljauw – Stefan Becuwe – Annie Cuyt

July 21, 2014 ICERM Workshop, Providence 29

SLIDE 29

Feedback

help us provide an excellent data service!!

Digit display

– Do you like or dislike? – Do you prefer just relative errors?

Extra digits and color

– Do you like or dislike?

Please send ideas for

– Further development – Further application areas

July 21, 2014 ICERM Workshop, Providence 30