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1000 results for “hywan”
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Oh, a Rust Future being awaited in Swift. How nice it is :-).
More to come.
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Oh, a Rust Future being awaited in Swift. How nice it is :-).
More to come.
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Oh, a Rust Future being awaited in Swift. How nice it is :-).
More to come.
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Oh, a Rust Future being awaited in Swift. How nice it is :-).
More to come.
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Rust async functions to Python over FFI ✅
Now let’s target Swift ⏳.
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Rust async functions to Python over FFI ✅
Now let’s target Swift ⏳.
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Rust async functions to Python over FFI ✅
Now let’s target Swift ⏳.
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Rust async functions to Python over FFI ✅
Now let’s target Swift ⏳.
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LSP type hints in Helix, https://github.com/helix-editor/helix/pull/5934.
Yeeaaaaah \o/.
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clangd, https://clangd.llvm.org/.
clangd is a language server for clang C++.
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ccls, https://github.com/MaskRay/ccls.
C/C++/ObjC language server supporting cross references, hierarchies, completion and semantic highlighting.
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Optimizing Rust programs with PGO and BOLT using cargo-pgo, https://kobzol.github.io/rust/cargo/2023/07/28/rust-cargo-pgo.html.
Feedback-directed optimisations made easy with `cargo-pgo`! Neat.
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소금을/설탕을/물을/허브를/향신료를 넣어요. sogeum-eul/seoltang-eul/mul-eul/heobeu-reul/hyangsinlyo-reul neoh-eoyo. I’m adding salt/sugar/water/herbs/spices. #Korean vocabulary for #cooking. #LearnKorean #languages. Click to #learn more. https://thelanguagegarage.com/cooking-in-korean/
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Landless
The Sugar Club, Friday, November 6 at 08:00 PM GMT
“Long-term Celtic music fans should flock to them – they’re a deliciously doomier Clannad – while devotees of Ireland’s current, brilliant scene should also respond to their stunning intensity.” – The Guardian Folk Album Of The Year
“While their albums are wonderful, seeing Landless live took my love of them to an entirely new level...They give me goosebumps from the very first note, every time." – Songlines
Enthusiastic Eunuch Presents
Landless (Glittebeat)
with special guest
Seamus Hyland
The Sugar Club
Friday 6th November 2026
Tickets €24 via https://billetto.ie/e/landless-glitterbeat-records-tickets-1922733
Landless are: Lily Power, Méabh Meir, Ruth Clinton and Sinéad Lynch. The Irish quartet sings centuries old ballads as well as more recently penned folk songs. Sometimes unaccompanied and at times with subtle instrumentation, their vocally rich music is dark and patient; spellbinding and gorgeous.
https://www.youtube.com/watch?v=Cu3HZEr_NAE
Lúireach, their second album, was named Folk Album of the Year 2024 by The Guardian. Lúireach is an album of quiet power, soaked in tradition but finding new and exciting ways to present these remarkable songs, songs that are full of melancholy, love, death and mystery.
https://www.youtube.com/watch?v=6cbbq1GZ_gA
Working once again with John ‘Spud’ Murphy (the Lankum producer and ØXN member), Lúireach
sees the quartet adding sparingly-used instrumentation – Ruth’s aching pump organ on Death & The
Lady, Méabh’s shruti box on Ej Husari, Lankum’s Cormac MacDiarmada on fiddle, viola and banjo
throughout, even some mournful trombone from Alex Borwick on The Newry Highwayman. As Lily explains, “A lot of the instrumentation happened organically as we were recording, while some
elements we have used live for years, like the organ. We tend not to make these kinds of decisions in
advance, but make suggestions as we go and see how everyone feels about it. Hopefully the album still has the impact of the unaccompanied singing, with a bit of variation this time around.”
The songs on Lúireach are from remarkably diverse sources and eras: the likes of Blackwaterside, Death & The Lady and My Lagan Love (learned from Traveller Paddy Doran, Norma Waterson and Méabh’s late father respectively) are probably known to even the casual fan of traditional music, while Lúireach Bhríde was commissioned for the RTÉ Folk Awards in 2018 and the closing song Ej Husari was learned from teacher and singer Eva Brunovská at the annual Rozhybkosti festival in Slovakia. Some of these songs are centuries old, some remarkably recent, yet when sung by Landless, they all sound timeless and eternal.
Seamas Hyland
Seamas Hyland is a multi-instrumentalist and composer who focuses on both traditional and experimental music. He enjoys exploring the varied sonic capabilities of the button accordion and creating tonal landscapes using field recordings he collects.Seamas recently released his debut solo album ‘Maidin Domhnaigh’ and was nominated for an RTÉ Folk award for best emerging artist in 2025. He has also collaborated with artists like John Francis Flynn, Jennie Moran and Eimear Walshe, and is particularly intrigued by the contrasting nature of traditional and contemporary music and how/if these can be presented together.
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A Wine Writer’s Top Italian Wines Of 2023
Carla Maugeri, Maugeri, Milo, Etna Photo Tom Hyland Think of this article as a “Best of Italian Wines” for 2023. I certainly did not taste every Italian wine (how c…
#dining #cooking #diet #food #ItalianWine #MediterraneanWine #BrunellodiMontalcino #cerasuolod'abruzzo #Etna #fianodiavellino #GRANSELEZIONE #GrecodiTufo #Italianwine #taurasi #Verdicchio #VinSanto #Wine
https://www.diningandcooking.com/2641998/a-wine-writers-top-italian-wines-of-2023/ -
President Lee Jae-myung has nominated Kim Sang-hwan as Chief Justice of the Constitutional Court, with Oh Young-jun and Lim Kwang-hyun tapped for key judicial and tax posts, signaling a move to restore trust and independence in South Korea's top legal institutions.
#YonhapInfomax #KimSangHwan #ConstitutionalCourt #PresidentLeeJaeMyung #NationalTaxService #JudicialAppointments #Economics #FinancialMarkets #Banking #Securities #Bonds #StockMarket
https://en.infomaxai.com/news/articleView.html?idxno=69507 -
Kim Sang-hwan, former Supreme Court justice, has been nominated as the next President of South Korea's Constitutional Court, signaling a potential shift in the nation's top judicial leadership.
#YonhapInfomax #KimSangHwan #ConstitutionalCourt #SupremeCourt #Nomination #JudicialLeadership #Economics #FinancialMarkets #Banking #Securities #Bonds #StockMarket
https://en.infomaxai.com/news/articleView.html?idxno=69503 -
'Absolute Value of Romance' is a new #kdrama on Amazon Prime
“At its heart is Yeo Eui-ju (Kim Hyang-gi), a seemingly ordinary high schooler who secretly pens bold #BL web novels.
Her quiet routine takes an unexpected turn when four charismatic new teachers join the faculty, unknowingly becoming the muses for her stories.”
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Estos recipientes de vidrio romanos llegaron al reino de Silla por la ruta de la estepa durante el siglo V d.C., conservándose en Hwangnamdaechong, la mayor tumba real de dicho reino, en Gyeongju, su capital. 🏛️Museo Nacional de Corea #antiguaroma #ancientrome #corea #korea #vidrio #glass
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When I was a student, the descriptions of multi-valued complex graphs obtained by suitably-joined slit planes always rankled, at least a little.
This unit circle \(z^{2} + w^{2} = 1\) with a portion of the \(z\)-plane at bottom, animated to show three loops lifted continuously, depicts all the Standard Business about holomorphic branches of \(\sqrt{1 - z^{2}}\) in singly- or doubly-slit planes with what accuracy 3-space can accommodate. (The imaginary part of \(w\) is projected away.)
Particularly, the lift of the large loop (encircling both points \(z = \pm 1\)) lies on a holomorphic branch of \(\sqrt{1 - z^{2}}\) defined in the slit plane \(\mathbf{C} \setminus [-1, 1]\).
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When I was a student, the descriptions of multi-valued complex graphs obtained by suitably-joined slit planes always rankled, at least a little.
This unit circle \(z^{2} + w^{2} = 1\) with a portion of the \(z\)-plane at bottom, animated to show three loops lifted continuously, depicts all the Standard Business about holomorphic branches of \(\sqrt{1 - z^{2}}\) in singly- or doubly-slit planes with what accuracy 3-space can accommodate. (The imaginary part of \(w\) is projected away.)
Particularly, the lift of the large loop (encircling both points \(z = \pm 1\)) lies on a holomorphic branch of \(\sqrt{1 - z^{2}}\) defined in the slit plane \(\mathbf{C} \setminus [-1, 1]\).
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When I was a student, the descriptions of multi-valued complex graphs obtained by suitably-joined slit planes always rankled, at least a little.
This unit circle \(z^{2} + w^{2} = 1\) with a portion of the \(z\)-plane at bottom, animated to show three loops lifted continuously, depicts all the Standard Business about holomorphic branches of \(\sqrt{1 - z^{2}}\) in singly- or doubly-slit planes with what accuracy 3-space can accommodate. (The imaginary part of \(w\) is projected away.)
Particularly, the lift of the large loop (encircling both points \(z = \pm 1\)) lies on a holomorphic branch of \(\sqrt{1 - z^{2}}\) defined in the slit plane \(\mathbf{C} \setminus [-1, 1]\).
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When I was a student, the descriptions of multi-valued complex graphs obtained by suitably-joined slit planes always rankled, at least a little.
This unit circle \(z^{2} + w^{2} = 1\) with a portion of the \(z\)-plane at bottom, animated to show three loops lifted continuously, depicts all the Standard Business about holomorphic branches of \(\sqrt{1 - z^{2}}\) in singly- or doubly-slit planes with what accuracy 3-space can accommodate. (The imaginary part of \(w\) is projected away.)
Particularly, the lift of the large loop (encircling both points \(z = \pm 1\)) lies on a holomorphic branch of \(\sqrt{1 - z^{2}}\) defined in the slit plane \(\mathbf{C} \setminus [-1, 1]\).
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When I was a student, the descriptions of multi-valued complex graphs obtained by suitably-joined slit planes always rankled, at least a little.
This unit circle \(z^{2} + w^{2} = 1\) with a portion of the \(z\)-plane at bottom, animated to show three loops lifted continuously, depicts all the Standard Business about holomorphic branches of \(\sqrt{1 - z^{2}}\) in singly- or doubly-slit planes with what accuracy 3-space can accommodate. (The imaginary part of \(w\) is projected away.)
Particularly, the lift of the large loop (encircling both points \(z = \pm 1\)) lies on a holomorphic branch of \(\sqrt{1 - z^{2}}\) defined in the slit plane \(\mathbf{C} \setminus [-1, 1]\).
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Individual Idol Brand Reputation Rankings Announced