Determinacy versus indeterminacy

Institut for Matematiske Fag

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Formidling

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Determinacy versus indeterminacy. / Berg, Christian.

I: Snapshots of modern mathematics from Oberwolfach, Bind 2020, Nr. 04, 2020.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Formidling

Harvard

Berg, C 2020, 'Determinacy versus indeterminacy', Snapshots of modern mathematics from Oberwolfach, bind 2020, nr. 04. https://doi.org/10.14760/SNAP-2020-004-EN

APA

Berg, C. (2020). Determinacy versus indeterminacy. Snapshots of modern mathematics from Oberwolfach, 2020(04). https://doi.org/10.14760/SNAP-2020-004-EN

Vancouver

Berg C. Determinacy versus indeterminacy. Snapshots of modern mathematics from Oberwolfach. 2020;2020(04). https://doi.org/10.14760/SNAP-2020-004-EN

Author

Berg, Christian. / Determinacy versus indeterminacy. I: Snapshots of modern mathematics from Oberwolfach. 2020 ; Bind 2020, Nr. 04.

Bibtex

@article{5d95134d7fb04c9bb6687b589513746f,

title = "Determinacy versus indeterminacy",

abstract = "Can a continuous function on an interval be uniquely determined if we know all the integrals of the function against the natural powers of the variable? Following Weierstrass and Stieltjes, we show that the answer is yes if the interval is finite, and no if the interval is infinite.",

author = "Christian Berg",

year = "2020",

doi = "10.14760/SNAP-2020-004-EN",

language = "English",

volume = "2020",

journal = "Snapshots of modern mathematics from Oberwolfach",

issn = "2626-1995",

number = "04",

}

RIS

TY - JOUR

T1 - Determinacy versus indeterminacy

AU - Berg, Christian

PY - 2020

Y1 - 2020

N2 - Can a continuous function on an interval be uniquely determined if we know all the integrals of the function against the natural powers of the variable? Following Weierstrass and Stieltjes, we show that the answer is yes if the interval is finite, and no if the interval is infinite.

AB - Can a continuous function on an interval be uniquely determined if we know all the integrals of the function against the natural powers of the variable? Following Weierstrass and Stieltjes, we show that the answer is yes if the interval is finite, and no if the interval is infinite.

U2 - 10.14760/SNAP-2020-004-EN

DO - 10.14760/SNAP-2020-004-EN

M3 - Journal article

VL - 2020

JO - Snapshots of modern mathematics from Oberwolfach

JF - Snapshots of modern mathematics from Oberwolfach

SN - 2626-1995

IS - 04

ER -

ID: 240145364