Sobolev, BV and perimeter extensions in metric measure spaces
Caputo, E., Koivu, J., & Rajala, T. (2024). Sobolev, BV and perimeter extensions in metric measure spaces. Annales Fennici Mathematici, 49(1), 135-165. https://doi.org/10.54330/afm.143899
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Annales Fennici MathematiciDate
2024Copyright
© 2024 The Finnish Mathematical Society
We study extensions of sets and functions in general metric measure spaces. We show that an open set has the strong BV-extension property if and only if it has the strong extension property for sets of finite perimeter. We also prove several implications between the strong BV-extension property and extendability of two different non-equivalent versions of Sobolev W 1,1 -spaces and show via examples that the remaining implications fail. Tutkimme joukkojen ja funktioiden laajennuksia yleisissä metrisissä mitta-avaruuksissa. Osoitamme, että avoimella joukolla on vahva BV-laajennusominaisuus jos ja vain jos sillä on vahva laajennusominaisuus äärellisperimetrisille joukoille. Tutkimme myös vahvan BV-laajennuksen yhteyttä kahteen eri versioon Sobolev W1,1-laajennuksista todistaen ne tapaukset missä yksi laajennusominaisuus antaa toisen sekä antamalla vastaesimerkit jäljelle jääviin tapauksiin
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Academy Project, AoFAdditional information about funding
The authors acknowledge the support from the Academy of Finland, grant no. 314789. The first named author also thanks the support from Academy of Finland, grant no. 321896.License
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